Optimal solution:

Consider the following linear programming problem

min z= −3x1+x2

Subject to constraints:

x1−2x2≥2

−x1+x2≥3

x1,x2≥0

Surplus variables and artificial variables are added, e1,a1,e2,a2

Therefore, the standard form of the linear programming problem is,

min z=−3x1+x2+Ma1+Ma2

Subject to constraints:

a2=3

−x1+x2−e2+a2=3

x1,x2,e1,a1,e2,a2≥0

The basic feasible solution is

a1=2

a2=3

Since basic feasible solution contains artificial variable, we need to eliminate the artificial variable.

We apply,

row 0+M(row 1)=0+M(2)+M(3)

2x3+x2+sp5−sm5=93

+M(x1−2x2−e1+a1)+M(−x1+x2−e2+a2)=

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Chapter 4, Problem 8RP

Chapter 4, Problem 10RP

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Solution Summary: The author explains the basic feasible solution of the linear programming problem: min z= a_2=3

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